1-2 Mass Degeneration in the Leptonic Sector

1-2 Mass Degeneration in the Leptonic Sector Hiroyuki ISHIDA (Tohoku University) 18th. Aug 2013 @SI 2013 Collaboration with : Takeshi ARAKI (MISC) Ref ; T. Araki and H.I. arXiv : 1211.4452 [hep-ph]

Introduction On Mar. in 2012, non-zero was discovered @DAYA-BAY. Phys. Rev. Lett. 108(2012) D. V. Forero et al. Phys. Rev. D 86(2012) and do not match the values predicted by tri-bi maximal anymore. We need to reconsider about the origin of flavour structure!

Motivation We would like to understand the origin of flavour structure by introducing some symmetries, BUT… Even if such symmetries were ensured at very high energy, it should be broken or hidden at low energy. Furthermore, we don’t know how to break these symmetries. Spontaneously? or Explicitly? Slightly? or Grossly? What is the guidepost?

Motivation One of the possible guide for searching such broken symmetries ’t Hooft’s criterion (1980) If a new symmetry appears in the model when arbitrary parameters set to zero, such parameters are naturally small. For example ; Lepton number symmetry In the limit of massless neutrinos in the effective theory, the lepton number symmetry appears. : this effective term violates lepton number 2 units.

Motivation Candidates of small parameters in lepton sector 1. T. Fukuyama and H. Nishiura (1997) G. Altarelli and F. Feruglio (1998) etc.. 2. 3. 4. This work 5. What happens when we focus on these small parameters?

Motivation of Orthogonal Symmetries Here, we take solar neutrino mass squared difference to be zero ; symmetry appears in the neutrino sector : In this limit, the In other words, the 1st and 2ndgeneration of neutrinos are embedded into a doublet representation of e.g., . This type of mass spectra cannot apply to charged fermion sector, because they are strongly hierarchical between the 3rd generation and others. For now, we assume

Motivation of Orthogonal Symmetries To construct realistic mass matrices, we introduce small breaking terms as Small breaking parameters Charged fermion sector In this situation, both of 2-3 and 1-3 mixings depend on . Small On the other hand, 1-2 one does not strongly depend on . Need not so small Compatible with mixing pattern of CKM matrix Neutrino sector Because neutrino mass spectrum might be milder than charged fermion sector, the leading term is close to the identity matrix. Weakly depend on Large mixing in the PMNS matrix Degeneracy of the 1st and 2nd generation seems to a good starting point.

Motivation of Degenerated Masses Neutrinolessdouble beta decay If the neutrino masses are degenerated, e.g. , the effective mass, , can be estimated as In both case, the effective mass is finite decay can be observed in near future? OR Such degenerated region will be excluded? Actually, such region is being excluded by Planck! Degenerated region is very attractive!

Model Charge assignments (The simplest extension of the MSM) and denote the indices of generations. where and represent the left- and right-handed leptons, respectively. means SM Higgs field. is SM gauge singlet scalar field. The VEVs of singlet scalar fields can be considered into two patterns.

Property of our Model ・Real scalar case where are functions of the VEVs of singlet scalar.

Properties of our Model ・In the basis of charged lepton mass matrix is diagonalized, Electron is massless and are zero These features are by remaining symmetry after breaking symmetry. Smallness of electron mass and is related with this symmetry.

Property of our Model ・Complex scalar case The remained symmetry is violated by complex VEVs of . Electron mass is induced as while 12 and 13 elements of the neutrino mass matrix are given as where and are functions of couplings and phases.

Conclusions ・We discuss a model in which 1st and 2nd generations are degenerated motivated by . ・In this model, mixing patterns of quarks and leptons are realized naturally due to dependence on small breaking parameter d. ・To illustrate such a degenerate model, we consider a DN flavor symmetric model which is a discrete subgroup of . ・We introduce one new DN doublet and SM gauge singlet scalar, . ・Due to residual symmetry, electron mass and tend to be small. ・Our model has a lot of parameters therefore, we cannot predict anything. However, we need not to assume hierarchy among the coupling constants in order to reconstruct experimental data.

Thank you for your attention!

Back up

DN flavour symmetry DN flavour symmetry is a dihedral group and discrete subgroup of . This symmetry has two singlet and some doublet irreducible representations. ・Multiplication rules (same as ) These extra charges are a little bit important for the model.

Model Lagrangian invariant under DN (up-to NNLO) Froggatt-Nielsen like structure due to DN A typical energy scale of DN symmetry Dimension five Weinberg operator with an energy scale .

Model After scalar fields have vacuum expectation values, mass matrices are given as follows : and s and s are some functions of where, There are so many parameters = No prediction. But we note that there is no strong hierarchy among each couplings.

Feature of mass matrices The mass matrix for charged lepton sector rank=1 If VEV of is real, the second term is also rank=1 matrix, therefore we can not obtain the electron mass. Here, we suppose complex VEVs for the scalar field, the second term is rank=2 matrix.

Feature of mass matrices This model has a relationship between electron mass and . When , the second term of charged lepton mass matrix can be divided into Each term is rank = 1 matrix. Correspond to muon mass Correspond to electron mass Small electron mass is induced by spontaneous CP violation, that is, non-vanishing .

Parameter sets (Normal hierarchy case)

Numerical Analysis ( plane) NH case IH case Constraints ・ and in 1s range ・ Fogliet al. 1205.5254 Foreroet al. PRD 86 Nearly maximal and relatively large are successfully obtained.

Possibility of Spontaneous CP Violation We assume that the singlet scalar fields were completely decoupled from the theory at high energy. We investigate only the potential of the singlet scalar Scalar potential

Possibility of Spontaneous CP Violation The minimization conditions respect with the phases are given as For simplicity, we set . Then we get, These condition suppose

Hierarchy among neutrino masses Completely degenerate Focusing region : Partially degenerate Completely hierarchical T. Araki @26th neutrino conference

1-2 Mass Degeneration in the Leptonic Sector